Title of article
Proper Bayes minimax estimators of the normal mean matrix with common unknown variances
Author/Authors
Tsukuma، نويسنده , , Hisayuki، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2010
Pages
11
From page
2596
To page
2606
Abstract
This paper addresses the problem of estimating a matrix of the normal means, where the variances are unknown but common. The approach to this problem is provided by a hierarchical Bayes modeling for which the first stage prior for the means is matrix-variate normal distribution with mean zero matrix and a covariance structure and the second stage prior for the covariance is similar to Jeffreys’ rule. The resulting hierarchical Bayes estimators relative to the quadratic loss function belong to a class of matricial shrinkage estimators. Certain conditions are obtained for admissibility and minimaxity of the hierarchical Bayes estimators.
Keywords
Admissibility , decision theory , Generalized Bayes estimation , Equivariance , Hierarchical model , Quadratic loss , Shrinkage estimator , Minimaxity
Journal title
Journal of Statistical Planning and Inference
Serial Year
2010
Journal title
Journal of Statistical Planning and Inference
Record number
2220868
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